Homological dimensions of Schur algebras S(p,2p) and an Auslander-type correspondence

Abstract

We study the homological properties of Schur algebras S(p, 2p) over a field k of positive characteristic p, focusing on their interplay with the representation theory of quotients of group algebras of symmetric groups via Schur-Weyl duality. Schur-Weyl duality establishes that the centraliser algebra, (p, 2p), of the tensor space (kp) 2p (as a module over S(p, 2p)) is a quotient of the group algebra of the symmetric group. In this paper, we prove that Schur-Weyl duality between S(p, 2p) and (p, 2p) is an instance of an Auslander-type correspondence. We compute the global dimension of Schur algebras S(p, 2p) and their relative dominant dimension with respect to the tensor space (kp) 2p. In particular, we show that the pair (S(p, 2p), (kp) 2p) forms a relative 4(p-1)-Auslander pair in the sense of Cruz and Psaroudakis, thereby connecting Schur algebras with higher homological algebra. Moreover, we determine the Hemmer-Nakano dimension associated with the quasi-hereditary cover of (p, 2p) that arises from Schur-Weyl duality. As an application, we show that the direct sum of some Young modules over (p, 2p) is a full tilting module when p>2.